Final Technical Report for "Applied Mathematics Research: Simulation Based Optimization and Application to Electromagnetic Inverse Problems"
Abstract
The focus of research was: Developing adaptive mesh for the solution of Maxwell's equations; Developing a parallel framework for time dependent inverse Maxwell's equations; Developing multilevel methods for optimization problems with inequality constraints; A new inversion code for inverse Maxwell's equations in the 0th frequency (DC resistivity); A new inversion code for inverse Maxwell's equations in low frequency regime. Although the research concentrated on electromagnetic forward and in- verse problems the results of the research was applied to the problem of image registration.
- Authors:
-
- Emory Univ., Atlanta, GA (United States)
- Publication Date:
- Research Org.:
- Emory Univ., Atlanta, GA (United States)
- Sponsoring Org.:
- USDOE Office of Energy Efficiency and Renewable Energy (EERE), Office of Fuels Development (EE-31)
- OSTI Identifier:
- 1123492
- Report Number(s):
- DOE-Emory-25696
- DOE Contract Number:
- FG02-05ER25696
- Resource Type:
- Technical Report
- Country of Publication:
- United States
- Language:
- English
- Subject:
- 97 MATHEMATICS AND COMPUTING; 71 CLASSICAL AND QUANTUM MECHANICS, GENERAL PHYSICS; Applied Mathematics
Citation Formats
Haber, Eldad. Final Technical Report for "Applied Mathematics Research: Simulation Based Optimization and Application to Electromagnetic Inverse Problems". United States: N. p., 2014.
Web. doi:10.2172/1123492.
Haber, Eldad. Final Technical Report for "Applied Mathematics Research: Simulation Based Optimization and Application to Electromagnetic Inverse Problems". United States. https://doi.org/10.2172/1123492
Haber, Eldad. 2014.
"Final Technical Report for "Applied Mathematics Research: Simulation Based Optimization and Application to Electromagnetic Inverse Problems"". United States. https://doi.org/10.2172/1123492. https://www.osti.gov/servlets/purl/1123492.
@article{osti_1123492,
title = {Final Technical Report for "Applied Mathematics Research: Simulation Based Optimization and Application to Electromagnetic Inverse Problems"},
author = {Haber, Eldad},
abstractNote = {The focus of research was: Developing adaptive mesh for the solution of Maxwell's equations; Developing a parallel framework for time dependent inverse Maxwell's equations; Developing multilevel methods for optimization problems with inequality constraints; A new inversion code for inverse Maxwell's equations in the 0th frequency (DC resistivity); A new inversion code for inverse Maxwell's equations in low frequency regime. Although the research concentrated on electromagnetic forward and in- verse problems the results of the research was applied to the problem of image registration.},
doi = {10.2172/1123492},
url = {https://www.osti.gov/biblio/1123492},
journal = {},
number = ,
volume = ,
place = {United States},
year = {Mon Mar 17 00:00:00 EDT 2014},
month = {Mon Mar 17 00:00:00 EDT 2014}
}
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